1. *Consider the points P(6, 2, 3) and Q(0, -1, 4). Find the vector u =PQ in component form.Type the answer WITHOUT space, eg.: <1,-1,1>.Your answer2. *Given v =<2, 0, -3>, w = <3, 4, -1>, and w = 2v – u. Find the vector u.Type the answer WITHOUT space, eg.: <1,-1,1>.Your answer 1. *Consider the points P(6, 2, 3) and Q(0, -1, 4). Find the vector u =PQ in component form.Type the answer WITHOUT space, eg.: <1,-1,1>.Your answer2. *Given v =<2, 0, -3>, w = <3, 4, -1>, and w = 2v – u. Find the vector u.Type the answer WITHOUT space, eg.: <1,-1,1>.Your answer

Answered: Image /qna-images/answer/8eb81bba-a036-4aec-8d6a-4b045e8f024c.jpg

Answered: 1. * Consider the points P(6, 2, 3) and…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Similar questions

Write the vector as a linear combination. PQ where P=(3,6) Q=(1,-3)
Find the length of the vector. = (5,0, 3, –2)
Find the component form of the indicated vector. Let u = (1,7) , N = {5,6). Find v - u. 2(7,-2) O (6, -1) (8, 1) O (4, 13)
Find if the vector w = (-3,2,-6) can be expressed as a linear combination of the vectors V₁ = (-1,-f, m) and v₂ = (m, l.f). Write the vectors V₁ and V₂ clearly. f=6 m=0 I=8
explain briefly ...
a. Write the vector (8, 5, 30) as a linear combination of a₁ = (4, -4,1), d₂ = (4, -5, 5) and d3 = (0, -4,-4). Express your answer in terms of the named vectors. Your answer should be in the form 4ả₁ +52 + 6ả3, which would be entered as 4a1 + 5a2 + 6a3. (8,5, 30) = b. Represent the vector (8,5,30) in terms of the ordered basis B = {(4,-4, 1), (4, −5, 5), (0, -4,-4)}. Your answer should be a vector of the general form . [(8, 5, 30)] B =

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1. * Consider the points P(6, 2, 3) and Q(0, -1, 4). Find the vector u =PQ in component form. Type the answer WITHOUT space, eg.: <1,-1,1>. Your answer 2. * Given v =<2, 0, -3>, w = <3, 4, -1>, and w = 2v - u. Find the vector u. Type the answer WITHOUT space, eg.: <1,-1,1>. Your answer